Kripke Completeness of Bi-intuitionistic Multilattice Logic and its Connexive Variant

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Studia Logica 105 (6):1193-1219 (2017)
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Abstract

In this paper, bi-intuitionistic multilattice logic, which is a combination of multilattice logic and the bi-intuitionistic logic also known as Heyting–Brouwer logic, is introduced as a Gentzen-type sequent calculus. A Kripke semantics is developed for this logic, and the completeness theorem with respect to this semantics is proved via theorems for embedding this logic into bi-intuitionistic logic. The logic proposed is an extension of first-degree entailment logic and can be regarded as a bi-intuitionistic variant of the original classical multilattice logic determined by the algebraic structure of multilattices. Similar completeness and embedding results are also shown for another logic called bi-intuitionistic connexive multilattice logic, obtained by replacing the connectives of intuitionistic implication and co-implication with their connexive variants.

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10.1007/s11225-017-9752-x

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Author Profiles

Yaroslav Shramko
Kryvyi Rih State Pedagogical University, Ukraine
Heinrich Wansing
Ruhr-Universität Bochum

Citations of this work

Connexive logic.Heinrich Wansing - 2008 - Stanford Encyclopedia of Philosophy.
Modal Multilattice Logic.Norihiro Kamide & Yaroslav Shramko - 2017 - Logica Universalis 11 (3):317-343.

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